Variable-node finite elements with smoothed integration techniques and their applications for multiscale mechanics problems
In this paper, variable-node finite elements with smoothed integration are proposed with emphasis on their applications for multiscale mechanics problems. The smoothed integration, which picks up strain matrix at discrete points along the cell boundary to form stiffness matrix, is combined with the variable-node finite elements, which have an arbitrary number of nodes on element side Hence, they effectively link meshes of different resolution along their nonmatching interface Particularly, they provide a powerful tool, when combined with homogenization schemes, for multiscale computing for complex heterogeneous structures. We show some applications of variable-node elements for multiscale problems to demonstrate their effectiveness. (C) 2009 Elsevier Ltd All rights reserved.
- Publisher
- PERGAMON-ELSEVIER SCIENCE LTD
- Issue Date
- 2010-04
- Language
- English
- Article Type
- Article
- Keywords
NONMATCHING MESHES; COMPUTATIONAL HOMOGENIZATION; HETEROGENEOUS MATERIALS; LAGRANGE MULTIPLIERS; COMPOSITE-MATERIALS; CRACK-GROWTH; STRESS; TISSUE
- Citation
COMPUTERS & STRUCTURES, v.88, no.7-8, pp.413 - 425
- ISSN
- 0045-7949
- Appears in Collection
- ME-Journal Papers(저널논문)
- Files in This Item
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